English

Perfectly Matched Sets in Graphs: Parameterized and Exact Computation

Discrete Mathematics 2022-11-08 v4

Abstract

In an undirected graph G=(V,E)G=(V,E), we say (A,B)(A,B) is a pair of perfectly matched sets if AA and BB are disjoint subsets of VV and every vertex in AA (resp. BB) has exactly one neighbor in BB (resp. AA). The size of a pair of perfectly matched sets (A,B)(A,B) is A=B|A|=|B|. The PERFECTLY MATCHED SETS problem is to decide whether a given graph GG has a pair of perfectly matched sets of size kk. We show that PMS is W[1]W[1]-hard when parameterized by solution size kk even when restricted to split graphs and bipartite graphs. We observe that PMS is FPT when parameterized by clique-width, and give FPT algorithms with respect to the parameters distance to cluster, distance to co-cluster and treewidth. Complementing FPT results, we show that PMS does not admit a polynomial kernel when parameterized by vertex cover number unless NPcoNP/polyNP\subseteq coNP/poly. We also provide an exact exponential algorithm running in time O(1.966n)O^*(1.966^n). Finally, considering graphs with structural assumptions, we show that PMS remains NPNP-hard on planar graphs.

Keywords

Cite

@article{arxiv.2107.08584,
  title  = {Perfectly Matched Sets in Graphs: Parameterized and Exact Computation},
  author = {N. R. Aravind and Roopam Saxena},
  journal= {arXiv preprint arXiv:2107.08584},
  year   = {2022}
}
R2 v1 2026-06-24T04:18:22.222Z